Two dimensional heteroclinic attractor in the generalized Lotka-Volterra system

Abstract

We study a simple dynamical model exhibiting sequential dynamics. We show that in this model there exist sets of parameter values for which a cyclic chain of saddle equilibria, Ok, k=1, …, p, have two dimensional unstable manifolds that contain orbits connecting each Ok to the next two equilibrium points Ok+1 and Ok+2 in the chain (Op+1 = O1). We show that the union of these equilibria and their unstable manifolds form a 2-dimensional surface with boundary that is homeomorphic to a cylinder if p is even and a M\"obius strip if p is odd. If, further, each equilibrium in the chain satisfies a condition called ``dissipativity," then this surface is asymptotically stable.